Sentence examples for mappings in partial from inspiring English sources

Later on, several authors (see, e.g., [11 17]) proved fixed point theorems of single-valued mappings in partial metric spaces.

Then we establish some common fixed point results for such two new types of mappings in partial b-metric spaces.

Recently Aydi et al. [18] proved a fixed point result for multivalued mappings in partial metric spaces.

In this work, we establish some fixed point theorems for weakly C-contractive mappings in partial metric spaces.

In this paper, we obtain some fixed point results for multi-valued mappings in partial metric spaces.

Now, we state and prove some fixed point results for generalized ( ϕ, g, h ) λ -weakly expansive mappings in partial b-metric spaces.

Meantime, we also establish the corresponding Suzuki-type coupled fixed point results for generalized mappings in partially ordered partial cone metric spaces.

Now, we establish some Suzuki-type fixed point theorems for generalized mappings in partially ordered partial cone metric spaces over a solid cone.

In this section, we will apply the results obtained in Section 2 to establish the corresponding Suzuki-type coupled fixed point theorems for generalized mappings in partially ordered partial cone metric spaces over a nonnormal cone.

Motivated by this intense research activity in fixed point theory in partial metric spaces, we present a Nemytskii-Edelstein type fixed point theorem for self-mappings in partial metric spaces in such a way that the classical one can be retrieved as a particular case of our new result.

Motivated by the Matthews extension of the Banach theorem, we present a Nemytskii-Edelstein type fixed point theorem for self-mappings in partial metric spaces in such a way that the classical one can be retrieved as a particular case of our new result.